Vitali covering

Vitali covering
Математика: покрытие Витали

Универсальный англо-русский словарь. . 2011.

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  • Vitali covering lemma — In mathematics, the Vitali covering lemma is a combinatorial and geometric result commonly used in measure theory of Euclidean spaces. tatement of the lemma* Finite version: Let B {1},...,B {n} be any collection of d dimensional balls contained… …   Wikipedia

  • Covering theorem — In mathematics, covering theorem can refer to Vitali covering lemma Jensen s covering theorem This disambiguation page lists mathematics articles associated with the same title. If an internal link led you here …   Wikipedia

  • Covering problem of Rado — The covering problem of Rado is an unsolved problem in geometry concerning covering planar sets by squares. It was formulated in 1928 by Tibor Radó and has been generalized to more general shapes and higher dimensions by Richard Rado. Formulation …   Wikipedia

  • Lemme De Recouvrement De Vitali — Le lemme de recouvrement de Vitali est un résultat combinatoire de théorie de l intégration des espaces euclidiens. Il est largement utilisé dans des démonstrations en analyse réelle. L idée basique du lemme est la suivante: supposons que l on… …   Wikipédia en Français

  • Lemme de recouvrement de vitali — Le lemme de recouvrement de Vitali est un résultat combinatoire de théorie de l intégration des espaces euclidiens. Il est largement utilisé dans des démonstrations en analyse réelle. L idée basique du lemme est la suivante: supposons que l on… …   Wikipédia en Français

  • Lemme de recouvrement de Vitali — Le lemme de recouvrement de Vitali[1] est un résultat combinatoire de théorie de l intégration des espaces euclidiens. Il est largement utilisé dans des démonstrations en analyse réelle. L idée basique du lemme est la suivante : supposons… …   Wikipédia en Français

  • Giuseppe Vitali — (August 26 1875 February 29 1932) was an Italian mathematician, remembered for the Vitali theorem on the existence of non measurable sets of real numbers. His Vitali covering lemma is also fundamental to measure theory.He was born in Ravenna and… …   Wikipedia

  • Differentiation of integrals — In mathematics, the problem of differentiation of integrals is that of determining under what circumstances the mean value integral of a suitable function on a small neighbourhood of a point approximates the value of the function at that point.… …   Wikipedia

  • List of mathematics articles (V) — NOTOC Vac Vacuous truth Vague topology Valence of average numbers Valentin Vornicu Validity (statistics) Valuation (algebra) Valuation (logic) Valuation (mathematics) Valuation (measure theory) Valuation of options Valuation ring Valuative… …   Wikipedia

  • Lebesgue differentiation theorem — In mathematics, the Lebesgue differentiation theorem is a theorem of real analysis.tatementFor a Lebesgue integrable real valued function f, the indefinite integral is a set function which maps a measurable set A to the Lebesgue integral of f… …   Wikipedia

  • Dyadic cubes — In mathematics, the dyadic cubes are a collection of cubes in ℝn of different sizes or scales such that the set of cubes of each scale partition ℝn and each cube in one scale may be written as a union of cubes of a smaller scale. These are… …   Wikipedia


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